
% Table created by stargazer v.5.2 by Marek Hlavac, Harvard University. E-mail: hlavac at fas.harvard.edu
% Date and time: Fri, Apr 22, 2022 - 21:12:37
% Requires LaTeX packages: rotating 
\begin{sidewaystable}[!htbp] \centering 
  \caption{Full regression output for Table A-21} 
  \label{table_news_aliens_cl} 
\begin{tabular}{@{\hspace{-10pt}}l@{\hspace{-10pt}}cccccccccc} 
\toprule 
 & \multicolumn{2}{c}{``immigrant''} & \multicolumn{2}{c}{``alien''} & \multicolumn{2}{c}{``jew''} & \multicolumn{2}{c}{``foreigner''} & \multicolumn{2}{c}{All} \\ 
 & (1) & (2) & (3) & (4) & (5) & (6) & (7) & (8) & (9) & (10)\\ 
\midrule  
\\[-2.1ex] $\Delta\textrm{IPW}_{1885}$ & 0.054$^{*}$ & 0.045 & 0.037 & 0.029 & 0.068$^{*}$ & 0.028 & 0.118$^{***}$ & 0.116$^{***}$ & 0.123$^{***}$ & 0.111$^{***}$ \\ 
  & (0.031) & (0.039) & (0.027) & (0.033) & (0.036) & (0.037) & (0.025) & (0.029) & (0.024) & (0.029) \\ 
 \addlinespace 
 const\_frac\_secondary $\times$ as.factor(year)1885 &  & $-$0.343 &  & 0.068 &  & $-$0.696 &  & 0.101 &  & $-$0.058 \\ 
  &  & (0.803) &  & (0.710) &  & (0.783) &  & (0.694) &  & (0.581) \\ 
 \addlinespace 
 const\_frac\_secondary $\times$ as.factor(year)1886 &  & 0.536 &  & $-$0.311 &  & $-$0.878 &  & $-$0.125 &  & $-$0.315 \\ 
  &  & (0.607) &  & (0.621) &  & (0.747) &  & (0.724) &  & (0.595) \\ 
 \addlinespace 
 const\_frac\_secondary $\times$ as.factor(year)1892 &  & 0.234 &  & 0.286 &  & $-$0.642 &  & $-$1.028 &  & $-$0.957$^{*}$ \\ 
  &  & (0.909) &  & (0.701) &  & (0.787) &  & (0.620) &  & (0.508) \\ 
 \addlinespace 
 const\_frac\_secondary $\times$ as.factor(year)1895 &  & 1.554$^{*}$ &  & 0.519 &  & $-$0.372 &  & $-$0.843 &  & $-$0.652 \\ 
  &  & (0.807) &  & (0.675) &  & (0.629) &  & (0.653) &  & (0.546) \\ 
 \addlinespace 
 const\_frac\_secondary $\times$ as.factor(year)1900 &  & 0.491 &  & 0.509 &  & 0.057 &  & $-$1.467$^{***}$ &  & $-$1.144$^{**}$ \\ 
  &  & (0.649) &  & (0.723) &  & (0.436) &  & (0.511) &  & (0.452) \\ 
 \addlinespace 
 const\_frac\_secondary $\times$ as.factor(year)1906 &  & 1.148$^{*}$ &  & 0.432 &  & 0.599 &  & $-$0.020 &  & 0.222 \\ 
  &  & (0.585) &  & (0.721) &  & (0.457) &  & (0.289) &  & (0.286) \\ 
 \addlinespace 
 const\_frac\_secondary $\times$ as.factor(year)1910 &  &  &  &  &  &  &  &  &  &  \\ 
  &  & (0.000) &  & (0.000) &  & (0.000) &  & (0.000) &  & (0.000) \\ 
 \addlinespace 
 const\_frac\_n\_irish $\times$ as.factor(year)1885 & 0.639 & 0.350 & $-$14.751$^{**}$ & $-$14.879$^{***}$ & $-$15.848$^{*}$ & $-$17.322$^{**}$ & $-$7.742$^{*}$ & $-$7.931 & $-$12.247$^{***}$ & $-$12.742$^{***}$ \\ 
  & (4.018) & (4.250) & (5.583) & (5.444) & (8.213) & (7.660) & (4.553) & (4.724) & (4.068) & (4.348) \\ 
 \addlinespace 
 const\_frac\_n\_irish $\times$ as.factor(year)1886 & $-$0.797 & $-$0.687 & $-$16.372$^{***}$ & $-$16.805$^{***}$ & $-$16.730$^{*}$ & $-$18.454$^{**}$ & $-$11.111$^{***}$ & $-$11.290$^{**}$ & $-$15.637$^{***}$ & $-$16.209$^{***}$ \\ 
  & (4.370) & (4.207) & (5.041) & (4.977) & (9.065) & (8.785) & (3.950) & (4.241) & (4.075) & (4.298) \\ 
 \addlinespace 
 const\_frac\_n\_irish $\times$ as.factor(year)1892 & $-$9.659$^{**}$ & $-$9.602$^{**}$ & $-$11.077$^{*}$ & $-$11.075$^{*}$ & $-$10.544 & $-$11.908$^{*}$ & $-$6.036 & $-$6.732 & $-$9.519$^{**}$ & $-$10.391$^{**}$ \\ 
  & (4.312) & (4.621) & (5.724) & (5.593) & (6.656) & (6.393) & (4.991) & (4.858) & (3.809) & (3.932) \\ 
 \addlinespace 
 const\_frac\_n\_irish $\times$ as.factor(year)1895 & 2.766 & 3.488 & $-$13.681$^{**}$ & $-$13.572$^{***}$ & $-$4.561 & $-$6.072 & $-$6.252 & $-$6.977 & $-$8.405$^{**}$ & $-$9.289$^{**}$ \\ 
  & (4.855) & (4.802) & (5.136) & (4.929) & (6.494) & (6.242) & (4.486) & (4.474) & (3.562) & (3.749) \\ 
 \addlinespace 
 const\_frac\_n\_irish $\times$ as.factor(year)1900 & $-$3.848 & $-$3.598 & $-$13.819$^{**}$ & $-$13.553$^{**}$ & $-$8.339 & $-$8.767 & $-$9.549 & $-$10.591 & $-$12.293$^{**}$ & $-$13.221$^{***}$ \\ 
  & (3.427) & (3.290) & (5.836) & (5.609) & (8.633) & (8.380) & (6.854) & (6.784) & (4.712) & (4.841) \\ 
 \addlinespace 
 const\_frac\_n\_irish $\times$ as.factor(year)1906 & $-$2.173 & $-$1.385 & $-$1.668 & $-$1.355 & $-$6.102$^{**}$ & $-$5.590$^{*}$ & 1.050 & 1.015 & $-$0.704 & $-$0.546 \\ 
  & (3.819) & (3.526) & (4.323) & (4.262) & (2.888) & (2.788) & (2.282) & (2.249) & (2.439) & (2.427) \\ 
 \addlinespace 
 const\_frac\_n\_irish $\times$ as.factor(year)1910 &  &  &  &  &  &  &  &  &  &  \\ 
  & (0.000) & (0.000) & (0.000) & (0.000) & (0.000) & (0.000) & (0.000) & (0.000) & (0.000) & (0.000) \\ 
 \addlinespace 
\midrule  
Initial immigrants x year & x & x & x & x & x & x & x & x & x & x \\ 
Initial Mf x year &  & x &  & x &  & x &  & x &  & x \\ 
Observations & 2,365 & 2,365 & 2,365 & 2,365 & 2,365 & 2,365 & 2,365 & 2,365 & 2,365 & 2,365 \\ 
R$^{2}$ & 0.652 & 0.655 & 0.705 & 0.705 & 0.804 & 0.805 & 0.779 & 0.781 & 0.798 & 0.799 \\ 
Adjusted R$^{2}$ & 0.561 & 0.563 & 0.627 & 0.627 & 0.752 & 0.753 & 0.721 & 0.722 & 0.745 & 0.746 \\ 
\bottomrule 
\textit{Note:}  & \multicolumn{10}{l}{$^{*}$p$<$0.1; $^{**}$p$<$0.05; $^{***}$p$<$0.01} \\ 
 & \multicolumn{10}{l}{\parbox[t]{0.6\textwidth}{
        Newspaper-level regressions. Dependent variable is number of uses of
        specified term per newspaper issue, standardized. All models include
        newspaper and year fixed effects. For newspapers in cities, $\Delta$IPW
        is calculated at the city-, not constituency-level.
        (9) and (10) use mentions
        of all four terms. Standard errors clustered by county in
        parentheses.}} \\ 
\end{tabular} 
\end{sidewaystable} 
